# Prime number checker unbelievably slow

I have this piece of code which checks whether a given number is prime:

``````If x Mod 2 = 0 Then
Return False
End If
For i = 3 To x / 2 + 1 Step 2
If x Mod i = 0 Then
Return False
End If
Next
Return True
``````

I only use it for numbers `1E7 <= x <= 2E7`. However, it is extremely slow - I can hardly check 300 numbers a second, so checking all `x`'s would take more than 23 days...

Could someone give some improvements tips or say what I might be doing redundantly this way?

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For a start, you only need to test up to `sqrt(x)`, not `x/2+1`. –  Oliver Charlesworth Feb 13 '11 at 11:20
Will that be faster? `sqrt(x)` would take more time to calculate I guess. –  pimvdb Feb 13 '11 at 11:21
`i` only needs to go until `sqrt(x)` (note that you only need to compute the square root once, not every iteration of the loop, so it will be faster), not `x / 2`. That should allow you to test that range a lot faster, but even more faster is the sieve of Eratosthenes. –  IVlad Feb 13 '11 at 11:22
firt line has error - you've write `i` instead of `x` –  gor Feb 13 '11 at 11:31
Just edited that - I'm sorry. –  pimvdb Feb 13 '11 at 11:34

You should definitely change your algorithm! You can try Sieve of Eratosthenes or a more advanced Fermat primality test. Beware that your code will be more complicated, as you would need to implement modular arithmetics. Look here for the list of some even more mathematically advanced methods.

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That is general algorithm for checking prime number. If you want to check prime number in bulk use algorithm http://en.wikipedia.org/wiki/Sieve_of_Eratosthenes

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Look up the term "Sieve of Eratosthenes". It's a two thousand years old algorithm which is way better than yours. It's often taught in school.

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You can also look for AKS primality test.
This is a good algorithm for checking primality.

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Since `x/2 + 1` is a constant through out the looping operation, keep it in a separate variable before the `For` loop. Thus, saving a division & addition operation every time you loop. Though this might slightly increase the performance.

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I think compiler should optimize this case –  gor Feb 13 '11 at 11:29
Should compiler do that too. I didn't knew that. Thanks. –  Mahesh Feb 13 '11 at 11:33

Use the Sieve of Eratosthenes to create a `Set` that contains all the prime numbers up to the largest number you need to check. It will take a while to set up the `Set`, but then checking if a number exists in it will be very fast.

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Split range in some chunks, and do checks in two or more threads, if you have multicore cpu. Or use `Parallel.For`.

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Thanks for your suggestion, but I seem to be using a very inefficient algorithm - so I won't use mine anyway. –  pimvdb Feb 13 '11 at 11:30
I would change the language to a faster one before doing parallelism in VB. –  stubbscroll Feb 13 '11 at 15:54

To check if the number is prime you have only check if it can't be divided by primes less then it.

`````` Sub Main()

Dim primes As New List(Of Integer)

For x As Integer = 1 To 1000
If IsPrime(x, primes) Then
Console.WriteLine(x)
End If
Next

End Sub

Private Function IsPrime(x As Integer, primes As IEnumerable(Of Integer)) As Boolean
For Each prime In primes
If prime <> 1 AndAlso prime <> x Then
If x Mod prime = 0 Then
Return False
End If
End If
Next
Return True
End Function
``````
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Thanks a lot, that will save a lot of time, mostly because the primes only have to be calculated once. However, I see that another algotihm exists which is much faster. –  pimvdb Feb 13 '11 at 11:34
only primes no greater then `sqrt(x)` should be checked against. The code as written will be very slow still - quadratic, instead of `~< k^1.5`, for `k` primes produced. The OP code is only `~ k^2 * log(k)`. The `log` speedup is about 15x (23 days => 1.5 days), but `sqrt` is about 800x more (=> 3 minutes). –  Will Ness Jan 20 '13 at 9:32

it slow because you use the x/2. I modified your code a little bit. (I don't know about syntax of VB, Maybe you have to change my syntax.)

``````If x < 2 Then
Return False
IF x == 2 Then
Return True
If x Mod 2 = 0 Then
Return False
End If
For i = 3 To (i*i)<=x Step 2
If x Mod i = 0 Then
Return False
End If
Next
Return True
``````
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